@Blastfurnace was on the right track. You use quickselect where the pivots are weight thresholds. Each partition splits one set of people into sets, and returns the total weight for each set of people. You continue breaking the appropriate bucket until your buckets corresponding to the highest weight people are over 3000 pounds, and your lowest bucket that is in that set has 1 person (that is, it can't be split any further.)

This algorithm is linear time amortized, but quadratic worst case. I think it is the only **linear time algorithm**.

Here's a Python solution that illustrates this algorithm:

```
#!/usr/bin/env python
import math
import numpy as np
import random
OVERWEIGHT = 3000.0
in_trouble = [math.floor(x * 10) / 10
for x in np.random.standard_gamma(16.0, 100) * 8.0]
dead = []
spared = []
dead_weight = 0.0
while in_trouble:
m = np.median(list(set(random.sample(in_trouble, min(len(in_trouble), 5)))))
print("Partitioning with pivot:", m)
lighter_partition = []
heavier_partition = []
heavier_partition_weight = 0.0
in_trouble_is_indivisible = True
for p in in_trouble:
if p < m:
lighter_partition.append(p)
else:
heavier_partition.append(p)
heavier_partition_weight += p
if p != m:
in_trouble_is_indivisible = False
if heavier_partition_weight + dead_weight >= OVERWEIGHT and not in_trouble_is_indivisible:
spared += lighter_partition
in_trouble = heavier_partition
else:
dead += heavier_partition
dead_weight += heavier_partition_weight
in_trouble = lighter_partition
print("weight of dead people: {}; spared people: {}".format(
dead_weight, sum(spared)))
print("Dead: ", dead)
print("Spared: ", spared)
```

Output:

```
Partitioning with pivot: 121.2
Partitioning with pivot: 158.9
Partitioning with pivot: 168.8
Partitioning with pivot: 161.5
Partitioning with pivot: 159.7
Partitioning with pivot: 158.9
weight of dead people: 3051.7; spared people: 9551.7
Dead: [179.1, 182.5, 179.2, 171.6, 169.9, 179.9, 168.8, 172.2, 169.9, 179.6, 164.4, 164.8, 161.5, 163.1, 165.7, 160.9, 159.7, 158.9]
Spared: [82.2, 91.9, 94.7, 116.5, 108.2, 78.9, 83.1, 114.6, 87.7, 103.0, 106.0, 102.3, 104.9, 117.0, 96.7, 109.2, 98.0, 108.4, 99.0, 96.8, 90.7, 79.4, 101.7, 119.3, 87.2, 114.7, 90.0, 84.7, 83.5, 84.7, 111.0, 118.1, 112.1, 92.5, 100.9, 114.1, 114.7, 114.1, 113.7, 99.4, 79.3, 100.1, 82.6, 108.9, 103.5, 89.5, 121.8, 156.1, 121.4, 130.3, 157.4, 138.9, 143.0, 145.1, 125.1, 138.5, 143.8, 146.8, 140.1, 136.9, 123.1, 140.2, 153.6, 138.6, 146.5, 143.6, 130.8, 155.7, 128.9, 143.8, 124.0, 134.0, 145.0, 136.0, 121.2, 133.4, 144.0, 126.3, 127.0, 148.3, 144.9, 128.1]
```

beforethe holiday season - not after I've over indulged myself. – jp2code Oct 18 '11 at 17:18